Let the equation of the pair of lines, y = px and y = qx, can be written as (y - px)(y - qx) = 0. Then the equation of the pair of the angle bisectors of the lines x² - 4xy – 5y² = 0 is: &lt;!-- [if !supportLineBreakNewLine]--&gt; &lt;!--[endif]--&gt;

x² - 3xy + y² = 0

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Straight Lines Ncert Solutions Maths class 11th Maths Class 11th

Let the equation of the pair of lines, y = px and y = qx, can be written as (y - px)(y - qx) = 0. Then the equation of the pair of the angle bisectors of the lines x² - 4xy – 5y² = 0 is:

Option 1 -

x² - 3xy + y² = 0

Option 2 -

x² + 3xy - y² = 0

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Answered by

alok kumar singh | Contributor-Level 10

a month ago

Correct Option - 2

Detailed Solution:

x² - 4xy – 5y² = 0
Equation of pair of straight line bisectors is (x²-y²)/ (a-b) = xy/h
(x²-y²)/ (1- (-5) = xy/ (-2)
(x²-y²)/6 = xy/ (-2)
x²-y² = -3xy
x² + 3xy - y² = 0

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Kindly consider the following figure

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Let the equation of the pair of lines, y = px and y = qx, can be written as (y - px)(y - qx) = 0. Then the equation of the pair of the angle bisectors of the lines x² - 4xy – 5y² = 0 is:

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